Method and device for transmitting uplink signal including data and control information via uplink channel

ABSTRACT

A method and device for transmitting a first and second uplink signal, each having data and control information is provided. The method includes channel encoding the control information of the second uplink signal based on a number of symbols of control information to produce. The channel encoding includes determining the number of symbols in accordance with a payload size of the data of the first uplink signal and a total number of transmissible symbols of a Physical Uplink Shared Channel (PUSCH) of the first uplink signal.

CROSS-REFERENCE TO RELATED APPLICATIONS

This application is a continuation of co-pending U.S. application Ser.No. 13/023,351, filed on Feb. 8, 2011, which is a continuation of U.S.application Ser. No. 12/472,162, filed on May 26, 2009, which claims thebenefit of Korean Patent Application No. 10-2009-0033078, filed on Apr.16, 2009 and U.S. Provisional Application Ser. Nos. 61/056,068, filed onMay 27, 2008, and 61/074,679, filed on Jun. 23, 2008. The entirecontents of each of these applications are incorporated herein byreference.

BACKGROUND OF THE INVENTION

1. Field of the Invention

The present invention relates to a method for transmitting an uplinksignal including control information and data through an uplink channel.

2. Discussion of the Related Art

Channel Structure and Mapping of LTE

The link channel structure and mapping of the 3^(rd) generationpartnership project (3GPP) long term evolution (LTE) will now bedescribed. A downlink physical channel includes a physical downlinkshared channel (PDSCH), a physical broadcast channel (PBCH), a physicalmulticast channel (PMCH), a physical control format indicator channel(PCFICH), a physical downlink control channel (PDCCH), and a physicalhybrid ARQ indicator channel (PHICH). An uplink physical channelincludes a physical uplink shared channel (PUSCH), a physical uplinkcontrol channel (PUCCH), and a physical random access channel (PRACH).

A downlink transport channel includes a broadcast channel (BCH), adownlink shared channel (DL-SCH), a paging channel (PCH), and amulticast channel (MCH). An uplink transport channel includes an uplinkshared channel (UL-SCH) and a random access channel (RACH).

FIG. 1 illustrates a mapping relationship between a downlink physicalchannel and a downlink transport channel. FIG. 2 illustrates a mappingrelationship between an uplink physical channel and an uplink transportchannel. The above-described physical channels and transport channelsare mapped to each other as illustrated in FIGS. 1 and 2.

Meanwhile, a logical channel classified as a control channel includes abroadcast control channel (BCCH), a paging control channel (PCCH), acommon control channel (CCCH), a multicast control channel (MCCH), and adedicated control channel (DCCH). A logical channel classified as atraffic channel includes a dedicated traffic channel (DTCH) and amulticast traffic channel (MTCH).

FIG. 3 illustrates a mapping relationship between a downlink transportchannel and a downlink logical channel. FIG. 4 illustrates a mappingrelationship between an uplink transport channel and an uplink logicalchannel.

Slot Structure of LTE

In a cellular orthogonal frequency division multiplexing (OFDM) radiopacket communication system, an uplink/downlink data packet istransmitted in units of subframes. One subframe is defined as aprescribed time duration including a plurality of OFDM symbols.

The 3GPP supports radio frame structure type 1 applicable to frequencydivision duplex (FDD) and radio frame structure type 2 applicable totime division duplex (TDD).

FIG. 5 illustrates the radio frame structure type 1. The radio frametype 1 consists of 10 subframes. One subframe consists of 2 slots.

FIG. 6 illustrates the radio frame structure type 2. The radio frametype 2 is comprised of two half-frames. Each half-frame consists of 5subframes, a downlink pilot time slot (DwPTS), a guard period (GP), andan uplink pilot time slot (UpPTS). One subframe consists of two slots.The DwPTS is used for an initial cell search, for synchronization or forchannel estimation. The UpPTS is used for channel estimation in anevolved Node B (eNB), uplink transmission synchronization of a UserEquipment (UE). The GP is an interval for eliminating interferencecaused by multi-path delay of downlink signal between uplink anddownlink. Namely, irrespective of a radio frame type, one subframeconsists of two slots.

FIG. 7 illustrates a downlink slot structure of LTE. As illustrated inFIG. 7, a signal transmitted in each slot may be represented by aresource grid comprised of N_(RB) ^(DL)N_(SC) ^(RB) subcarriers andN_(symb) ^(DL) OFDM symbols. At this time, N_(RB) ^(DL) denotes thenumber of resource blocks (RBs) in a downlink, N_(SC) ^(RB) denotes thenumber of subcarriers constituting one RB, and N_(symb) ^(DL) denotesthe number of OFDM symbols in one downlink slot.

FIG. 8 illustrates an uplink slot structure of LTE. As illustrated inFIG. 8, a signal transmitted in each slot may be represented by aresource grid comprised of N_(RB) ^(UL)N_(SC) ^(RB) subcarriers andN_(symb) ^(UL) OFDM symbols. At this time, N_(RB) ^(UL) denotes thenumber of resource blocks (RBs) in an uplink, N_(SC) ^(RB) denotes thenumber of subcarriers constituting one RB, and N_(symb) ^(UL) denotesthe number of OFDM symbols in one uplink slot. A resource element refersto one subcarrier and one OFDM symbol as a resource unit defined byindexes (a, b) (where a is an index on a frequency domain and b is anindex on a time domain) within the uplink slot and the downlink slot.

Meanwhile, the eNB transmits control information to a downlink tocontrol a UL-SCH which is an uplink transport channel. The controlinformation transmitted to the downlink informs the UE of the number ofRBs transmitted through the UL-SCH and a modulation order. In addition,when data is transmitted to an uplink, the control information informsthe UE of a payload size of the data. The payload size may be defined asthe sum of the size of information (e.g., the size of data, or the sizeof control information) transmitted from a medium access control (MAC)layer and the size of cyclic redundancy check (CRC) attached arbitrarilyto the information in a physical layer. The payload of the controlinformation may not include the size of the CRC because the CRC cannotbe attached to the control information according to the size of thecontrol information before the CRC is attached to the controlinformation. Specifically, if the size of the control information towhich the CRC is not attached is smaller than or equal to 11 bits, theCRC is not attached to the control information. In addition, if the sizeof the control information to which the CRC is not attached is greaterthan or equal to 12 bits, the CRC is attached to the controlinformation.

Data and control information (e.g., Channel Quality Information(CQI)/Precoding Matrix Indicator (PMI) or Rank Indication (RI)) may bemultiplexed together and transmitted through the UL-SCH. In theconventional system, a scheme for encoding the data differs from ascheme for encoding the control information. Furthermore, in theconventional system, a block error rate (BLER) of the data and a BLER ofthe control information, demanded by the eNB, may differ from eachother.

Furthermore, in the conventional system, even though a code rate of datais known using the modulation order, the number of RBs, and the payloadsize of data, a code rate of control information cannot be known.Moreover, since the data and the control information are multiplexedtogether and then transmitted through the UL-SCH, the number oftransmitted symbols of the data cannot be known.

To solve such problems, the conventional system was upgraded such thatthe code rate of the control information is compensated for by an offsetthat can be changed by the eNB as compared with the code rate of thedata.

Even if the system is managed as described above, the code rate of thedata may be varied by information multiplexed with the data. Moreover,if the data is not transmitted, the UE cannot estimate a code rate ofCQI/PMI or rank indication for example. Accordingly, a method forcalculating a code rate of transmitted information (e.g., CQI/PMI orrank indication) according to a combination of information transmittedthrough the UL-SCH is demanded.

Also, in the conventional communication system, if an error occurs in adata packet due to failure of receipt after the data packet istransmitted, the corresponding data packet is re-transmitted.

Also, in the case where re-transmission occurs, if decoding is performedusing an initially received data packet and a data packet received byre-transmission, a success probability of receiving the data packet isincreased even though not all resources employed when the data packet isinitially transmitted are used.

For example, when the communication system operates such that theinitial data packet is transmitted without errors with a probability of90%, the system does not encounter any problem even when the data packetis re-transmitted at a code rate higher than a code rate of the initialdata packet. Transmitting a data packet at a high code rate means thatless physical transmission resources are used than during the initialtransmission of the data packet.

If a code rate of CQI/PMI or rank indication is calculated using thetotal number of symbols of the data when re-transmitting the datapacket, a code rate for stably transmitting the CQI/PMI or rankindication may not be set. Therefore, when data is re-transmitted, acode rate setting method for stably transmitting the CQI/PMI or rankindication is demanded.

In summary, in an attempt to save bandwidth while retransmitting, aconventional mobile is commanded by a base station to reduce the amountof total information bits (i.e., data and control bits) that areretransmitted. This does not result in an increased error rate for thedata bits because the retransmitted payload data is soft combined withthe original payload data. However, corresponding control data of thetwo signals are not combined for decoding/demodulation. That is, in theconventional system, the truncated control bits of the retransmittedsignal are used for code rate setting, resulting in degradedperformance. Thus, the present invention compensates for thisdegradation in performance by reusing the original control data in anovel fashion.

SUMMARY OF THE INVENTION

Accordingly, the present invention is directed to a method and devicefor transmitting a first and second uplink signal, each having data andcontrol information. The method includes channel encoding the controlinformation of the second uplink signal based on a number of symbols ofcontrol information to produce. The channel encoding includes detenlining the number of symbols in accordance with a payload size of thedata of the first uplink signal and a total number of transmissiblesymbols of a Physical Uplink Shared Channel (PUSCH) of the first uplinksignal.

Preferably, the step of determining may include determining the numberof symbols in accordance with a payload size of the control informationof the second uplink signal and an offset value applied to the controlinformation of the second uplink signal.

Preferably, the method may further include channel encoding the data ofthe second uplink signal to produce second channel encoded data; channelinterleaving the first and second channel encoded data to generate thesecond uplink signal; and transmitting the second uplink signal.

Preferably, the number of symbols of control information may satisfy theexpression:

$M_{X} = \left\lceil {N_{X} \cdot \beta_{X} \cdot \frac{M_{RE}^{PUSCH}}{N_{data}}} \right\rceil$

where M_(X) is the number of the symbols of the control information,

N_(X) is the payload size of the control information,

β_(X) is the offset value,

N_(data) is the size of the data of the first uplink signal,

M_(RE) ^(PUSCH) is the total number of transmissible symbols of PhysicalUplink Shared Channel (PUSCH) of the first uplink signal, and “┌ ┐”denotes a ceiling function.

Preferably, the control information may be one of channel qualitycontrol information and a rank indication, and the channel qualitycontrol information may include at least one of Channel QualityInformation (CQI) and a Precoding Matrix Indicator (PMI).

Preferably, the control information may be one of channel qualitycontrol information and a rank indication, and a payload size of thechannel quality control information includes a size of Cyclic RedundancyCheck (CRC) attached to the channel quality control information.

Preferably, the method may further include retrieving the payload sizeof the data of the first uplink signal and the total number oftransmissible symbols of the Physical Uplink Shared Channel (PUSCH) ofthe first uplink signal from a memory or a cache.

Preferably, the number of symbols of control information may satisfy theexpression:

$Q^{\prime} = \left\lceil \frac{O \cdot M_{sc}^{{PUSCH}\text{-}{initial}} \cdot N_{symb}^{{PUSCH}\text{-}{initial}} \cdot \beta_{offset}^{PUSCH}}{\sum\limits_{r = 0}^{C - 1}K_{r}} \right\rceil$

where

Q′ is the number of the symbols of the control information of the seconduplink signal,

O is the payload size of the control information of the second uplinksignal,

N_(symb) ^(PUSCH-initial) is a number of SC-FDMA symbols per subframefor Physical Uplink Shared Channel (PUSCH) transmission of the firstuplink signal, M_(sc) ^(PUSCH-initial) is a scheduled bandwidth PUSCHtransmission for Physical Uplink Shared Channel (PUSCH) transmission ofthe first uplink signal,

β_(offset) ^(PUSCH) is the offset value,

$\sum\limits_{r = 0}^{C - 1}K_{r}$

is the payload size of the data of the first uplink signal, r is codeblock number of the data of the first uplink signal before channelcoding of the data of the first uplink signal, K_(r) is a number of bitsin code block number r, and C is a total number of code blocks.

Also, there is a method and device for processing a received first andsecond uplink signal, each having data and control information. Themethod includes channel decoding channel encoded data with a payloadsize of the data of the first uplink signal and a total number oftransmissible symbols of a PUSCH of the first uplink signal to producethe control information of the second uplink signal.

Preferably, the step of channel decoding may include channel decodingthe channel encoded data with a payload size of the control informationof the second uplink signal and an offset value applied to the controlinformation of the second uplink signal.

Preferably, a number of symbols of control information decoded in thestep of decoding satisfy the expression:

$Q^{\prime} = \left\lceil \frac{O \cdot M_{sc}^{{PUSCH}\text{-}{initial}} \cdot N_{symb}^{{PUSCH}\text{-}{initial}} \cdot \beta_{offset}^{PUSCH}}{\sum\limits_{r = 0}^{C - 1}K_{r}} \right\rceil$

where

Q′ is the number of the symbols of the control information of the seconduplink signal,

O is the payload size of the control information of the second uplinksignal,

N_(symb) ^(PUSCH-initial) is a number of SC-FDMA symbols per subframefor Physical Uplink Shared Channel (PUSCH) transmission of the firstuplink signal, M_(sc) ^(PUSCH-initial) is a scheduled bandwidth PUSCHtransmission for Physical Uplink Shared Channel (PUSCH) transmission ofthe first uplink signal,

β_(offset) ^(PUSCH) is the offset value,

$\sum\limits_{r = 0}^{C - 1}K_{r}$

is the payload size of the data of the first uplink signal, r is codeblock number of the data of the first uplink signal before channelcoding of the data of the first uplink signal, K_(r) is a number of bitsin code block number r, and C is a total number of code blocks.

BRIEF DESCRIPTION OF THE DRAWINGS

The accompanying drawings, which are included to provide a furtherunderstanding of the invention and are incorporated in and constitute apart of this application, illustrate embodiments of the invention andtogether with the description serve to explain the principle of theinvention. In the drawings:

FIG. 1 illustrates a mapping relationship between a downlink physicalchannel and a downlink transport channel.

FIG. 2 illustrates a mapping relationship between an uplink physicalchannel and an uplink transport channel.

FIG. 3 illustrates a mapping relationship between a downlink transportchannel and a downlink logical channel.

FIG. 4 illustrates a mapping relationship between an uplink transportchannel and an uplink logical channel.

FIG. 5 is the radio frame structure type 1.

FIG. 6 is the radio frame structure type 2.

FIG. 7 is a downlink slot structure of LTE.

FIG. 8 is an uplink slot structure of LTE.

FIG. 9A illustrates a processing of data and control informationtransmitted through a UL-SCH which is an uplink transport channel.

FIG. 9B illustrates an alternative processing of data and controlinformation transmitted through a UL-SCH which is an uplink transportchannel.

FIG. 10 is a subframe structure after data and control information aremultiplexed.

FIG. 11 illustrates an example of modulation constellation coordinates.

FIG. 12 illustrates an example of modulation constellation coordinates.

FIG. 13 describes HARQ (Hybrid Automatic Repeat request) process forexplaining data retransmission.

FIG. 14 is a diagram explaining a use relationship of a reference MCSduring re-transmission of data.

FIG. 15 is a block diagram of a UE according to an exemplary embodimentof the present invention.

FIG. 16 is a block diagram showing constitutional elements of a device50 that can be either a UE or an eNB.

DETAILED DESCRIPTION OF THE INVENTION

Reference will now be made in detail to the exemplary embodiments of thepresent invention, examples of which are illustrated in the accompanyingdrawings. The detailed description, which will be given below withreference to the accompanying drawings, is intended to explain exemplaryembodiments of the present invention, rather than to show the onlyembodiments that can be implemented according to the invention. Thefollowing detailed description includes specific details in order toprovide a thorough understanding of the present invention. However, itwill be apparent to those skilled in the art that the present inventionmay be practiced without such specific details. For example, thefollowing description will be given centering on specific terms, but thepresent invention is not limited thereto and any other terms may be usedto represent the same meanings.

FIG. 9A illustrates processing of data and control informationtransmitted through a UL-SCH which is an uplink transport channel.

A transport block (TB) CRC is attached to the TB of data transmitted toan uplink in step S901. The data is to be multiplexed with controlinformation (CQI/PMI or rank indication). The CRC attached data issegmented into multiple code blocks (CBs) according to the size of theTB in step S902 and a CB CRC is attached to the CBs in step S903.Channel coding is performed upon the CRC-attached CBs in step S904. Thechannel coded data is rate-matched in step S905 and CBs are concatenatedin step S906. The concatenated CBs are multiplexed with controlinformation in step S907.

Meanwhile, a CRC is attached to CQI/PMI in step S908 and channel codingis performed upon the CRC-attached CQI/PMI in step S909. Thechannel-coded CQI/PMI is rate-matched in step S910 and multiplexed withthe data in step S907. Although the channel coding process and the ratematching process are described as separate processes, the channel codingprocess may include the rate matching process in some cases.

Rank indication is channel-coded in step S911 separately from the data.The channel-coded rank indication is rate-matched in step S912. Althoughthe channel coding process and the rate matching process are describedas separate processes, the channel coding process may include the ratematching process in some cases.

A channel interleaving process is performed upon the multiplexed data,CQI/PMI, and rank indication in step S913.

Channel coding is performed upon acknowledgement (ACK)/negativeacknowledgement (NACK) information in step S914 separately from thedata, CQI/PMI, and rank indication.

The ACK/NACK information is inserted through puncturing a part of thechannel-interleaved signal. The interleaved signal into which theACK/NACK information is inserted is transmitted to the uplink afterphysical resource mapping in step S915.

The channel coded data, CQI/PMI, and rank indication of specific sizesare converted into data, CQI/PMI, and rank indication having prescribednumbers of symbols or bits transmitted in a physical layer through ratematching. In this case, the number of symbols or bits transmitted in thephysical layer should be present with respect to each of the data,CQI/PMI, and rank indication.

FIG. 9B illustrates an alternative processing of data and controlinformation transmitted through a UL-SCH which is an uplink transportchannel.

Error detection is provided on UL-SCH transport blocks through a CyclicRedundancy Check (CRC) in step S100.

The entire transport block is used to calculate the CRC parity bits. Thebits in a transport block delivered to layer 1 are denoted by a₀, a₁,a₂, a₃, . . . , a_(A-1). The parity bits are denoted by p₀, p₁, p₂, p₃,. . . , p_(L-1). A is the size of the transport block and L is thenumber of parity bits.

Code block segmentation and code block CRC attachment are performedafter transport block CRC attachment in step 110. The bits input to thecode block segmentation are denoted by b₀, b₁, b₂, b₃, . . . , b_(B-1)where B is the number of bits in the transport block (including CRC).The bits after code block segmentation are denoted by c_(r0), c_(r1),c_(r2), c_(r3), . . . , c_(r(K) _(r) ₋₁₎, where r is the code blocknumber and K_(r) is the number of bits for code block number r.

Channel coding is performed after code block segmentation and code blockCRC in step 120. After encoding the bits are denoted by d_(r0) ^((i)),d_(r1) ^((i)), d_(r2) ^((i)), d_(r3) ^((i)), . . . , d_(r(D) _(r) ₋₁₎^((i)), with i=0, 1, and 2 and where D_(r), is the number of bits on thei-th coded stream for code block number r, i.e. D_(r)=K_(r)+4.

Rate matching is performed on Turbo coded blocks after channel coding instep 130. After rate matching, the bits are denoted by e_(r0), e_(r1),e_(r2), e_(r3), . . . , e_(r(E) _(r) ₋₁₎, where r is the coded blocknumber, and where E_(r), is the number of rate matched bits for codeblock number r.

Code block concatenation is performed after rate matching in step 140.The bits after code block concatenation are denoted by f₀, f₁, f₂, f₃, .. . , f_(G-1), where G is the total number of coded bits fortransmission excluding the bits used for control transmission, whencontrol information is multiplexed with the UL-SCH transmission.

The channel coding of the channel quality information is performed withinput sequence o₀, o₁, o₂, . . . , o_(O-1) in step 150. The outputsequence for the channel coding of channel quality information isdenoted by q₀, q₁, q₂, q₃, . . . , q_(Q) _(CGI) ₋₁.

The channel coding of the RI is preformed with input sequence [o₀ ^(RI)]or [o₀ ^(RI) o₁ ^(RI)] in step 160. [o₀ ^(RI)] and [o₀ ^(RI) o₁ ^(RI)]denotes 1-bit RI and denotes 2-bits RI, respectively.

The channel coding of the HARQ-ACK is performed with input sequence [o₀^(ACK)], [o₀ ^(ACK) o₁ ^(ACK)] or [o₀ ^(ACK) o₁ ^(ACK) . . . o_(O)_(ACK) ₋₁ ^(ACK)] in step 170. Each positive acknowledgement (ACK) isencoded as a binary ‘1’ and each negative acknowledgement (NAK) isencoded as a binary ‘0’. HARQ-ACK can consist of 1-bit of information,i.e., [o₀ ^(ACK)] or 2-bits of information, i.e., [o₀ ^(ACK) o₁ ^(ACK)]with o₀ ^(ACK) corresponding to ACK/NACK bit for codeword 0 and o₁^(ACK) corresponding to that for codeword 1. In addition, HARQ-ACK canconsist of more than two bits information, i.e. [o₀ ^(ACK) o₁ ^(ACK) . .. o_(O) _(ACK) ₋₁ ^(ACK)] with O^(ACK)>2. The bit sequence q₀ ^(ACK), q₁^(ACK), q₂ ^(ACK), . . . , q_(Q) _(ACK) ₋₁ ^(ACK) is obtained byconcatenation of multiple encoded HARQ-ACK blocks where Q_(ACK) is thetotal number of coded bits for all the encoded HARQ-ACK blocks.

The inputs to the data and control multiplexing are the coded bits ofthe control information denoted by q₀, q₁, q₂, q₃, . . . , q_(Q) _(CGI)₋₁ and the coded bits of the UL-SCH denoted by f₀, f₁, f₂, f₃, . . . ,f_(G-1) in step 180. The output of the data and control multiplexingoperation is denoted by g ₀, g ₁, g ₂, g ₃, . . . , g _(H′-1), whereH=(G+Q_(GQI)) and H′=H/Q_(m), and where g _(i) with i=0, . . . , H′−1are column vectors of length Q_(m). H is the total number of coded bitsallocated for UL-SCH data and CQI/PMI information.

The channel interleaving is performed with the output of the data andcontrol multiplexing operation denoted by g ₀, g ₁, g ₂, g ₃, . . . , g_(H′-1), the encoded rank indication denoted by the q₀, q₁, q₂, q₃, . .. , q_(Q) _(CGI) ₋₁ and the encoded HARQ-ACK denoted by q₀ ^(ACK), q₁^(ACK), q₂ ^(ACK), . . . , q_(Q) _(ACK) ₋₁ ^(ACK).

The bits after channel interleaving are denoted by h₀, h₁, h₂, . . . ,h_(H+Q) _(RI) ₋₁. The number of modulation symbols in the subframe isgiven by H″=H′+Q_(RI).

FIG. 10 illustrates a subframe structure after data and controlinformation are multiplexed. The subframe after data, CQI/PMI, rankindication, and ACK/NACK information are appropriately multiplexed in aphysical layer is as shown in FIG. 10.

Hereinafter, a method will be described for calculating code rates ofdata and control information when data is transmitted through an UL-SCH.

When data is simultaneously transmitted together with other information(e.g., at least one of CQI/PMI information and rank indication), sincesuch control information transmitted together with the data ismultiplexed together with the data after rate matching, the number oftransmitted symbols of the data and the number of transmitted symbols ofthe control information transmitted together with the data are neededupon transmission of the data. Herein, “the number of transmittedsymbols” means the number of symbols output through rate matching.Therefore, in the present invention, “the number of transmitted symbols”is referred to as the number of symbols output through rate matching.

In addition, in the present invention, a payload size may be defined asthe sum of the size of information (e.g., the size of data, or the sizeof control information) transmitted from a medium access control (MAC)layer and the size of cyclic redundancy check (CRC) attached arbitrarilyto the information in a physical layer. The payload of the controlinformation may not include the size of the CRC because the CRC may notbe attached to the control information according to the size of thecontrol information before the CRC is attached to the controlinformation. Specifically, if the size of the control information towhich the CRC is not attached is smaller than or equal to 11 bits, theCRC is not attached to the control information. In addition, if the sizeof the control information to which the CRC is not attached is greaterthan or equal to 12 bits, the CRC is attached to the controlinformation.

If a code rate and a modulation order of the transmitted data areaccurately known, a reference modulation and coding scheme (MCS) may bedefined using the code rate and modulation order of the data. An MCS ofthe control information transmitted together with the data may beestimated using the reference MCS and using offset information of thecontrol information.

Assuming that the inverse of spectral efficiency obtained by a code rateand a modulation order of data is MCS_(data), MCS_(data) may becalculated using the following Equation 1.

$\begin{matrix}{{M\; C\; S_{data}} = \frac{1}{{{CodeRate} \cdot {Modulation}}\mspace{14mu} {Order}}} & \left\lbrack {{Equation}\mspace{14mu} 1} \right\rbrack\end{matrix}$

If a reference MCS is MCS_(ref), a payload size of CQI/PMI is N_(CQI),and a parameter expressing, in dB, an offset value for compensating fora difference between a block error rate of data and a block error rateof CQI/PMI and a difference between a data encoding scheme and a CQI/PMIencoding scheme is Δ_(CQI), the number M_(CQI) of transmitted symbols ofCQI/PMI may be calculated using the following Equation 2.

$\begin{matrix}{M_{CQI} = \left\lceil {{N_{CQI} \cdot 10^{\frac{\Delta_{CQI}}{10}} \cdot M}\; C\; S_{ref}} \right\rceil} & \left\lbrack {{Equation}\mspace{14mu} 2} \right\rbrack\end{matrix}$

In Equation 2, “┌ ┐” denotes a ceiling function. The ceiling functionrepresents a function whose value is the smallest integer not less thana value within the symbol. For example, ┌2.3┐ indicates 3 because thesmallest integer not less than 2.3 is 3.

In addition, if reference MCS is MCS_(ref), a payload size of rankindication is N_(RI), and a parameter expressing, in dB, an offset valuefor compensating for a difference between a block error rate of data anda block error rate of rank indication and a difference between a dataencoding scheme and a rank indication encoding scheme is Δ_(RI), thenumber M_(RI), of transmitted symbols of rank indication may beexpressed by the following Equation 3.

$\begin{matrix}{M_{RI} = \left\lceil {{N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot M}\; C\; S_{ref}} \right\rceil} & \left\lbrack {{Equation}\mspace{14mu} 3} \right\rbrack\end{matrix}$

If a code rate and modulation order of data used when calculating areference MCS are known, the number of transmitted symbols of CQI/PMIand the number of transmitted symbols of rank indication may becalculated. However, if an eNB commands transmission of data on anUL-SCH, the eNB informs a UE of only the total number of symbols whichcan be transmitted when the data and other information are multiplexed,a payload size of the data, and the modulation order of the data.Therefore, agreement between the eNB and the UE is required to calculatethe reference MCS.

Embodiment 1-A

As illustrated in FIG. 9A, when the data, CQI/PMI, and rank indicationare transmitted together, the data, CQI/PMI, and rank indication arerate-matched and then multiplexed. To calculate the number oftransmitted symbols of each of the data, CQI/PMI, and rank indication,equations of a complicated closed form or iterative equations should beused.

Accordingly, a method for briefly calculating the reference MCS isproposed. However, if the method for calculating the reference MCS issimplified, an accurate code rate of the information may not be applied.

The method for calculating the reference MCS uses the code rate andmodulation order of data under the assumption that only the data istransmitted on the UL-SCH without transmitting the CQI/PMI or rankindication.

Specifically, a reference code rate may be calculated using thefollowing Equation 4.

$\begin{matrix}{{CR}_{data} = \frac{N_{data}}{Q_{data} \cdot M_{RE}^{PUSCH}}} & \left\lbrack {{Equation}\mspace{14mu} 4} \right\rbrack\end{matrix}$

where CR_(data) denotes a reference code rate, N_(data) denotes apayload size of data, Q_(data) denotes a modulation order of data whichis a reference modulation order, and M_(RE) ^(PUSCH) is the total numberof symbols which can be transmitted through a physical channel whentransmitting data through the UL-SCH. In the present invention, theM_(RE) ^(PUSCH) is correspond to M_(sc) ^(PUSCH-initial) where theM_(sc) ^(PUSCH) is the scheduled bandwidth for PUSCH transmission in acurrent sub-frame for the transport block, and N_(symb) ^(PUSCH) is thenumber of SC-FDMA symbols in the current PUSCH transmission sub-frame.

Therefore, the reference MCS MCS_(ref) may be calculated using thefollowing Equation 5.

$\begin{matrix}{{M\; C\; S_{ref}} = {\frac{1}{{CR}_{data} \cdot Q_{data}} = \frac{M_{RE}^{PUSCH}}{N_{data}}}} & \left\lbrack {{Equation}\mspace{14mu} 5} \right\rbrack\end{matrix}$

where CR_(data) denotes a reference code rate, N_(data) denotes apayload size of Q_(data) denotes a modulation order of data which is areference modulation order, and M_(RE) ^(PUSCH) denotes the total numberof symbols which can be transmitted through a physical channel whentransmitting data through the UL-SCH.

Generally, a CRC is attached to data to check for errors. In Equation 4and Equation 5, the payload size N_(data) of data is defined as a valueincluding the CRC but may not include the CRC for simple approximation.

Application of Embodiment 1-A In the Case where Data and CQI/PMI areTransmitted Together

When data and CQI/PMI are transmitted on the UL-SCH, the reference MCSis calculated using the payload size N_(data) of data. The number offinally transmitted symbols of the CQI/PMI may be calculated using thefollowing Equation 6.

$\begin{matrix}{M_{CQI} = \left\lceil {{N_{CQI} \cdot 10^{\frac{\Delta_{CQI}}{10}} \cdot M}\; C\; S_{ref}} \right\rceil} & \left\lbrack {{Equation}\mspace{14mu} 6} \right\rbrack\end{matrix}$

where N_(CQI) denotes a payload size of CQI/PMI, and Δ_(CQI) denotes aparameter expressing, in dB, an offset value for compensating for adifference between the block error rate of data and the block error rateof CQI/PMI and a difference between a data encoding scheme and a CQI/PMIencoding scheme, and M_(CQI) denotes the number of transmitted symbolsof CQI/PMI after rate matching.

If the number M_(CQI) of transmitted symbols of the CQI/PMI is obtainedusing Equation 6, the number M_(data) of transmitted symbols of data maybe calculated using the following Equation 7.

M _(data) =M _(RE) ^(PUSCH) −M _(CQI)  [Equation 7]

where M_(RE) ^(PUSCH) denotes the total number of symbols which can betransmitted through a physical channel when transmitting data on aUL-SCH. Since the data and CQI/PMI are multiplexed after they arerate-matched, the number of symbols obtained by subtracting M_(CQI) fromM_(RE) ^(PUSCH) is the number M_(data) of symbols of data.

Application of Embodiment 1-A In the Case where Data and Rank Indicationare Transmitted Together

When data and rank indication are transmitted on the UL-SCH, the numberM_(RI), of transmitted symbols of the rank indication may be calculatedusing the following Equation 8, similarly to when the data and CQI/PMIare transmitted.

$\begin{matrix}{M_{RI} = \left\lceil {{N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot M}\; C\; S_{ref}} \right\rceil} & \left\lbrack {{Equation}\mspace{14mu} 8} \right\rbrack\end{matrix}$

where N_(RI) denotes a payload size of rank indication, and Δ_(RI)denotes a parameter expressing, in dB, an offset value for compensatingfor a difference between the block error rate of data and the blockerror rate of rank indication and a difference between a data encodingscheme and a rank indication encoding scheme, and M_(RI) denotes thenumber of transmitted symbols of rank indication.

Once M_(RI) is obtained using Equation 8, the number M_(data) oftransmitted symbols of data may be calculated using the followingEquation 9.

M _(data) =M _(RE) ^(PUSCH) −M _(RI)  [Equation 9]

where M_(RE) ^(PUSCH) denotes the total number of symbols which can betransmitted through a physical channel when transmitting data on aUL-SCH. Since the data and rank indication are multiplexed after theyare rate-matched, the number of symbols obtained by subtracting M_(RI)from M_(RE) ^(PUSCH) is the number M_(data) of symbols of the data.

Application of Embodiment 1-A In the Case where Data, CQI/PMI, and RankIndication are Transmitted Together

When the data, CQI/PMI, and rank indication are transmitted together,the number M_(CQI) of transmitted symbols of CQI/PMI and the numberM_(RI) of transmitted symbols of rank indication are calculated usingthe reference MCS as follows.

$\begin{matrix}{M_{CQI} = \left\lceil {N_{CQI} \cdot 10^{\frac{\Delta_{CQI}}{10}} \cdot {MCS}_{ref}} \right\rceil} & \left\lbrack {{Equation}\mspace{14mu} 10} \right\rbrack \\{M_{RI} = \left\lceil {N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot {MCS}_{ref}} \right\rceil} & \left\lbrack {{Equation}\mspace{14mu} 11} \right\rbrack\end{matrix}$

If M_(CQI) and M_(RI) are obtained, M_(data) is calculated using M_(RE)^(PUSCH) as follows.

M _(data) =M _(RE) ^(PUSCH) −M _(CQI) −M _(RI)  [Equation 12]

For accurate decoding of data, CQI/PMI, and rank indication between a UEand an eNB, the above-mentioned calculations should be accuratelycarried out. However, since the above equations include

$10^{\frac{\Delta_{CQI}}{10}},10^{\frac{\Delta_{RI}}{10}},$

etc., irrational number values may be calculated. Therefore, acalculation result in the UE and the eNB may vary according tocalculation methods of multiplication, division, and

$10^{\frac{\Delta_{CQI}}{10}}\mspace{14mu} {and}\mspace{14mu} 10^{\frac{\Delta_{RI}}{10}}$

in the UE and eNB.

A method is proposed for calculating the numbers of transmitted symbolsof CQI/PMI and rank indication such that a calculation result ofdivision does not generate a remainder.

The numbers of transmitted symbols of the CQI/PMI and rank indicationare calculated using the following Equation 13.

$\begin{matrix}{M_{X} = \left\lceil {N_{X} \cdot 10^{\frac{\Delta_{X}}{10}} \cdot {MCS}_{ref}} \right\rceil} & \left\lbrack {{Equation}\mspace{14mu} 13} \right\rbrack\end{matrix}$

where N_(X) denotes a payload size of information X, Δ_(X) denotes aparameter expressing, in dB, an offset value for compensating for adifference between the block error rate of data and the block error rateof the information X and a difference between a data decoding scheme andan information X decoding scheme, and M_(X) denotes the number oftransmitted symbols of information X.

In Equation 13,

$10^{\frac{\Delta_{X}}{10}},$

and MCS_(ref) defined in Equation 5 may be differently calculated in theUE and the eNB. The UE and eNB may promise to previously define

$10^{\frac{\Delta_{X}}{10}}$

as a quantized value.

Table 1 listed below shows a result of quantizing

$10^{\frac{\Delta_{X}}{10}}.$

For example, the UE and the eNB may define

$10^{\frac{\Delta_{X}}{10}}$

as a quantized value as shown in Table 1. In Table 1,

$\beta_{X}\left( {\text{=}{{quan}\left( 10^{\frac{\Delta_{X}}{10}} \right)}} \right)$

indicates a value of quantizing

$10^{\frac{\Delta_{X}}{10}}.$

A fractional part of

$\beta_{X} = {{quan}\left( 10^{\frac{\Delta_{X}}{10}} \right)}$

may be expressed by N bits. In Table 1, a quantized result of β_(X) isshown such that a fractional part thereof can be expressed by 6 bits.

TABLE 1     Index     Δ_(X)$\beta_{X} = {{quan}\left( 10^{\frac{\Delta_{X}}{10}} \right)}$ 0 (000)0 dB 1.0000000000 1 (001) 1 dB 1.2500000000 2 (010) 2 dB 1.5781250000 3(011) 3 dB 1.9843750000 . . . . . . 2.5000000000 7 (111) 7 dB3.1562500000

Table 2 and 3 listed below show a result of calculating β_(X) when theinformation X is CQI/PMI or rank indication.

TABLE 2 Index β_(RI) 0 1.250 1 1.625 2 2.000 3 2.500 4 3.125 5 4.000 65.000 7 6.250 8 8.000 9 10.000 10 12.625 11 15.875 12 20.000 13 reserved14 reserved 15 reserved

TABLE 3 Index β_(CQI) 0 0.750 1 1.000 2 1.125 3 1.250 4 1.375 5 1.625 61.750 7 2.000 8 2.250 9 2.500 10 2.875 11 3.125 12 3.500 13 4.000 145.000 15 6.250

Since MCS_(ref) may have various values, the UE and eNB should storelarge quantities of values in order to define MCS_(ref) as a quantizedvalue between the UE and the eNB. However, in order not to store thequantized value, division which may generate a non-integer calculationresult should be eliminated.

Using Equation 13 and Equation 5, the number M_(X) of transmittedsymbols of information X can be as follows.

$\begin{matrix}\begin{matrix}{M_{X} = \left\lceil {N_{X} \cdot 10^{\frac{\Delta_{X}}{10}} \cdot {MCS}_{ref}} \right\rceil} \\{= \left\lceil {N_{X} \cdot 10^{\frac{\Delta_{X}}{10}} \cdot \frac{M_{RE}^{PUSCH}}{N_{data}}} \right\rceil}\end{matrix} & \left\lbrack {{Equation}\mspace{14mu} 14} \right\rbrack\end{matrix}$

In Equation 14, a denominator of MCS_(ref) may be transposed towardsM_(X). When transposing values within a ceiling function, equality (“=”)may be converted to inequality (“≧”). Namely, in the ceiling function,

$Z = \left\lceil \frac{Y}{X} \right\rceil$

can be expressed as Z·X≧Y on condition that Z is the smallest integersatisfying Z·X≧Y.

Thus, an equation for calculating the number of transmitted symbols ofinformation X transmitted through a physical channel to solve aquantization problem may be defined as follows.

M _(X) ·N _(data) ≧N _(X)·β_(X) ·M _(RE) ^(PUSCH)  [Equation 15]

where M_(RE) ^(PUSCH) denotes the total number of symbols which can betransmitted through a physical channel when transmitting data through aUL-SCH, N_(data) denotes a payload size of data, N_(X) denotes thepayload size of the information X, M_(X) denotes the number oftransmitted symbols of the information X and β_(X) denotes a value ofquantizing

$10^{\frac{\Delta_{X}}{10}}.$

When N_(data), N_(X), β_(X), and M_(RE) ^(PUSCH) are given, M_(X)becomes the smallest integer satisfying Equation 15.

In addition, since β_(X) is greater than 1, the inverse of β_(X), thatis, β′_(X)=1/β_(X) may be used in Equation 15. The reason why β′_(X) isused is that when storing β_(X), an integer part and a fractional partshould be stored but when memorizing β′_(X), only the fractional partcan be stored. Accordingly, Equation 15 for calculating the number oftransmitted symbols of the information X through a physical channel tosolve the quantization problem may be defined as follows.

M _(X)β′_(X) ·N _(data) ≧N _(X) ·M _(RE) ^(PUSCH)  [Equation 16]

When N_(data), N_(X), β′_(X), and M_(RE) ^(PUSCH) are given, M_(X) isthe smallest integer satisfying Equation 16.

In Embodiment 1-A, the reference MCS is calculated using a code rate anda modulation order of data under the assumption that only the data istransmitted on a UL-SCH without transmitting CQI/PMI or rank indication.Therefore, the reference MCS may not be an accurate value.

Namely, in Embodiment 1-A, an accurate code rate may not be applied toinformation (i.e., data, CQI/PMI and rank indication). Assuming that thereference code rate is a code rate of data, the code rate of data can bedetermined only when an occupied ratio of CQI/PMI and rank indicationamong the entire amount of information should be determined. Theoccupied ratio of CQI/PMI and rank indication among the entire amountcan be known only when the code rate of data should be determined.

Embodiment 1-B

In Embodiment 1-B of the present invention, a method is proposed forsimultaneously calculating reference code rates of data, CQI/PMI andrank indication in a closed form using the fact that the total number oftransmitted symbols is the sum of the numbers of transmitted symbols ofthe data, CQI/PMI and rank indication on a UL-SCH. Specifically,assuming that a reference MCS is an unknown parameter and the numbers oftransmitted symbols of CQI/PMI and rank indication are expressed as afunction of the reference MCS, since the total number of transmittedsymbols of the data, CQI/PMI and rank indication is known, an accuratereference MCS can be obtained.

Application of Embodiment 1-B In the Case where Data and CQI/PMI areTransmitted Together

When only data and CQI/PMI are transmitted, the total number oftransmitted symbols may be indicated by the sum of the number oftransmitted symbols of the CQI/PMI and the number of transmitted symbolsof the data. Accordingly, a reference MCS is calculated using theequation for calculating the number of transmitted symbols of theCQI/PMI and the equation for calculating the number of transmittedsymbols of the data. Next, the number of transmitted symbols of the datais calculated using the calculated reference MCS and the number oftransmitted symbols of the CQI/PMI are calculated.

More specifically, the number of transmitted symbols of the data iscalculated using the following Equation 17. In this case, the number oftransmitted symbols of the CQI/PMI is expressed by a function of thenumber of transmitted symbols of the data and a closed-form equation isobtained as shown in the following Equation 18.

$\begin{matrix}\begin{matrix}{M_{RE}^{PUSCH} = {M_{CQI} + M_{data}}} \\{= {\left\lceil {N_{CQI} \cdot 10^{\frac{\Delta_{CQI}}{10}} \cdot {MCS}_{ref}} \right\rceil + \left\lceil {N_{data} \cdot {MCS}_{ref}} \right\rceil}} \\{= {\left\lceil {N_{CQI} \cdot 10^{\frac{\Delta_{CQI}}{10}} \cdot \frac{M_{data}}{N_{data}}} \right\rceil + \left\lceil {N_{data} \cdot \frac{M_{data}}{N_{data}}} \right\rceil}}\end{matrix} & \left\lbrack {{Equation}\mspace{14mu} 17} \right\rbrack \\{\mspace{79mu} {M_{RE}^{PUSCH} = {\left\lceil {N_{CQI} \cdot 10^{\frac{\Delta_{CQI}}{10}} \cdot \frac{M_{data}}{N_{data}}} \right\rceil + M_{data}}}} & \left\lbrack {{Equation}\mspace{14mu} 18} \right\rbrack\end{matrix}$

In Equation 17 and Equation 18, N_(data) denotes a payload size of data,M_(data) denotes the number of transmitted symbols of the date, M_(RE)^(PUSCH) denotes the total number of symbols which can be transmittedthrough a physical channel, MCS_(ref) denotes a reference MCS, N_(CQI)denotes a payload size of CQI/PMI, Δ_(CGI) denotes a parameterexpressing, in dB, an offset value for compensating for a differencebetween a block error rate of data and a block error rate of CQI/PMI anda difference between a data encoding scheme and a CQI/PMI encodingscheme, and M_(CQI) denotes the number of transmitted symbols ofCQI/PMI.

Meanwhile, to solve a quantization problem, Equation 18 may be replacedwith the following Equation 19.

(M _(RE) ^(PUSCH) −M _(data))·N _(data) ≧N _(CQI)·β_(CQI) ·M_(data)  [Equation 19]

where β_(CQI) denotes a value obtained by quantizing

$10^{\frac{\Delta_{CQI}}{10}}.$

When N_(data), N_(CQI), β_(CQI), and M_(RE) ^(PUSCH) are given, data isthe smallest integer satisfying Equation 19.

If M_(data) is obtained using Equation 19, M_(CQI) may be calculatedusing the following Equation 20.

M _(CQI) =M _(RE) ^(PUSCH) −M _(data)  [Equation 20]

Application of Embodiment 1-B In the Case where Data and Rank Indicationare Transmitted Together

When only data and rank indication are transmitted a UL-SCH, the numberof transmitted symbols of the rank indication is calculated similarly tothe case where only the data and CQI/PMI are transmitted. A referenceMCS is calculated using the equation for calculating the number oftransmitted symbols of the rank indication and the equation forcalculating the number of transmitted symbols of the data. The number oftransmitted symbols of the data is calculated using the calculatedreference MCS and the number of transmitted symbols of the rankindication is calculated.

More specifically, the number of transmitted symbols of the data iscalculated using the following Equation 21. In this case, the number oftransmitted symbols of the rank indication is expressed by a function ofthe number of transmitted symbols of the data and a closed-form equationis obtained as shown in the following Equation 22.

$\begin{matrix}\begin{matrix}{M_{RE}^{PUSCH} = {M_{RI} + M_{data}}} \\{{= {\left\lceil {N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot {MCS}_{ref}} \right\rceil + \left\lceil {N_{data} \cdot {MCS}_{ref}} \right\rceil}}\;} \\{= {\left\lceil {N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot \frac{M_{data}}{N_{data}}} \right\rceil + \left\lceil {N_{data} \cdot \frac{M_{data}}{N_{data}}} \right\rceil}}\end{matrix} & \left\lbrack {{Equation}\mspace{14mu} 21} \right\rbrack \\{M_{RE}^{PUSCH} = {\left\lceil {N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot \frac{M_{data}}{N_{data}}} \right\rceil + M_{data}}} & \left\lbrack {{Equation}\mspace{14mu} 22} \right\rbrack\end{matrix}$

In Equation 21 and Equation 22, N_(data) denotes a payload size of data,M_(data) denotes the number of transmitted symbols of the date, M_(RE)^(PUSCH) denotes the total number of symbols which can be transmittedthrough a physical channel, MCS_(ref) denotes a reference MCS, N_(RI)denotes a payload size of rank indication, Δ_(RI) denotes a parameterexpressing, in dB, an offset value for compensating for a differencebetween a block error rate of data and a block error rate of rankindication and a difference between a data encoding scheme and a rankindication encoding scheme, and M_(RI) denotes the number of transmittedsymbols of rank indication.

Meanwhile, to solve a quantization problem, Equation 22 may be replacedwith the following Equation 23.

(M _(RE) ^(PUSCH) −M _(data))·N _(data) ≧N _(RI)·β_(RI) ·M_(data)  [Equation 23]

where β_(RI) denotes a value obtained by quantizing

$10^{\frac{\Delta_{RI}}{10}}.$

When N_(data), N_(RI), β_(RI), and M_(RE) ^(PUSCH) are given, M_(data)is the smallest integer satisfying Equation 23.

If M_(data) is obtained using Equation 23, M_(RI) may be calculatedusing the following Equation 24.

M _(RI) =M _(RE) ^(PUSCH) −M _(data)  [Equation 24]

Application of Embodiment 1-B In the Case where Data, CQI/PMI, and RankIndication are Transmitted Together

When data, CQI/PMI, and rank indication are transmitted, the totalnumber of transmitted symbols on a UL-SCH may be indicated by the sum ofthe number of transmitted symbols of the CQI/PMI, the number oftransmitted symbols of the rank indication, and the number oftransmitted symbols of the data. Therefore, a reference MCS may becalculated using the equation for calculating the number of transmittedsymbols of the CQI/PMI, the equation for calculating the number oftransmitted symbols of the rank indication, and the equation forcalculating the number of transmitted symbols of the data. The number oftransmitted symbols of the data may be calculated using the calculatedreference MCS and the numbers of transmitted symbols of the CQI/PMI andthe rank indication may be calculated.

More specifically, the number of transmitted symbols of the data iscalculated using the following Equation 25. In this case, the numbers oftransmitted symbols of the CQI/PMI and the rank indication are expressedby a function of the number of transmitted symbols of the data and aclosed-form equation is obtained as shown in the following Equation 26.

$\begin{matrix}\begin{matrix}{M_{RE}^{PUSCH} = {M_{CQI} + M_{RI} + M_{data}}} \\{= {\left\lceil {N_{CQI} \cdot 10^{\frac{\Delta_{CQI}}{10}} \cdot {MCS}_{ref}} \right\rceil +}} \\{{\left\lceil {N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot {MCS}_{ref}} \right\rceil \; + \left\lceil {N_{data} \cdot {MCS}_{ref}} \right\rceil}} \\{= {\left\lceil {N_{CQI} \cdot 10^{\frac{\Delta_{CQI}}{10}} \cdot \frac{M_{data}}{N_{data}}} \right\rceil + \left\lceil {N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot \frac{M_{data}}{N_{data}}} \right\rceil +}} \\{\left\lceil {N_{data} \cdot \frac{M_{data}}{N_{data}}} \right\rceil}\end{matrix} & \left\lbrack {{Equation}\mspace{14mu} 25} \right\rbrack \\{M_{RE}^{PUSCH} = {\left\lceil {N_{CQI} \cdot 10^{\frac{\Delta_{CQI}}{10}} \cdot \frac{M_{data}}{N_{data}}} \right\rceil + \left\lceil {N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot \frac{M_{data}}{N_{data}}} \right\rceil + M_{data}}} & \left\lbrack {{Equation}\mspace{14mu} 26} \right\rbrack\end{matrix}$

In Equation 25 and Equation 26, N_(data) denotes a payload size of data,M_(data) denotes the number of transmitted symbols of the date, M_(RE)^(PUSCH) denotes the total number of symbols which can be transmittedthrough a physical channel, MCS_(ref) denotes a reference MCS, N_(CQI)denotes a payload size of CQI/PMI, Δ_(CQI) denotes a parameterexpressing, in dB, an offset value for compensating for a differencebetween a block error rate of data and a block error rate of CQI/PMI anda difference between a data encoding scheme and a CQI/PMI encodingscheme, M_(CQI) denotes the number of transmitted symbols of CQI/PMI,N_(RI) denotes a payload size of rank indication, Δ_(RI) denotes aparameter expressing, in dB, an offset value for compensating for adifference between a block error rate of data and a block error rate ofrank indication and a difference between a data encoding scheme and arank indication encoding scheme, and M_(RI) denotes the number oftransmitted symbols of rank indication.

Meanwhile, to solve a quantization problem, Equation 26 may be replacedwith the following Equation 27.

(M _(RE) ^(PUSCH) −M _(data))·N _(data) ≧N _(RI)·β_(RI) ·M _(data) +N_(CQI)·β_(CQI) ·M _(data)  [Equation 27]

where β_(CQI) denotes a value obtained by quantizing

$10^{\frac{\Delta_{CQI}}{10}},$

β_(RI) denotes a value obtained by quantizing

$10^{\frac{\Delta_{RI}}{10}}.$

When N_(data), N_(RI), β_(RI), N_(CQI), β_(CQI), and M_(RE) ^(PUSCH) aregiven, M_(data) is the smallest integer satisfying Equation 27.

If M_(data) is obtained, M_(RI) or M_(CQI) is calculated. At this time,a method for calculating M_(CQI) using the following Equation 28 isproposed after calculating M_(data) so that a code rate of rankindication by a ceiling function may be lower than a reference coderate. This is because the rank indication may be more important thanCQI/PMI.

$\begin{matrix}{{M_{RE}^{PUSCH} - M_{data}} = {M_{CQI} + \left\lceil {N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot \frac{M_{CQI}}{N_{CQI}}} \right\rceil}} & \left\lbrack {{Equation}\mspace{14mu} 28} \right\rbrack\end{matrix}$

Meanwhile, to solve a quantization problem, Equation 28 may be replacedwith Equation 29.

(M _(RE) ^(PUSCH) −M _(data) −M _(CQI))·N _(CQI) ≧N _(RI)·β_(RI) ·M_(CQI)  [Equation 29]

When M_(data), N_(RI), β_(RI), N_(CQI), and M_(RE) ^(PUSCH) are given,M_(CQI) is the smallest integer satisfying Equation 29.

If M_(data) and M_(CQI) are obtained, M_(RI) may be calculated asfollows.

M _(RI) =M _(RE) ^(PUSCH) −M _(data) −M _(CQI)  [Equation 30]

Meanwhile, if M_(RI) is calculated before calculating M_(CQI), thefollowing Equation 31 may be used.

$\begin{matrix}{{M_{RE}^{PUSCH} - M_{data}} = {M_{RI} + \left\lceil {N_{CQI} \cdot 10^{\frac{\Delta_{CQI}}{10}} \cdot \frac{M_{RI}}{N_{RI}}} \right\rceil}} & \left\lbrack {{Equation}\mspace{14mu} 31} \right\rbrack\end{matrix}$

To solve a quantization problem, Equation 31 may be replaced withEquation 32.

(M _(RE) ^(PUSCH) −M _(data) −M _(RI))·N _(RI) ≧N _(CQI)·β_(RI) ·M_(RI)  [Equation 32]

When M_(data), N_(RI), β_(RI), N_(CQI), and M_(RE) ^(PUSCH) are given,M_(RI) is the smallest integer satisfying Equation 32.

If M_(data) and M_(RI) are obtained, M_(CQI) may be calculated asfollows.

M _(CQI) =M _(RE) ^(PUSCH) −M _(data) −M _(RI)  [Equation 33]

The reason why M_(CQI) or M_(RI) is calculated after calculatingM_(data) by the above methods is that values of

$\frac{M_{data}}{N_{data}},\frac{M_{CQI}}{N_{CQI}},{{and}\mspace{14mu} \frac{M_{RI}}{N_{RI}}}$

used as a reference MCS are determined to be almost equal.

In the case where a CRC having a different length is attached to each ofdata and CQI/PMI or a plurality of CRCs is attached to each of the dataand CQI/PMI, the values of

$\frac{M_{data}}{N_{data}},\frac{M_{CQI}}{N_{CQI}},{{and}\mspace{14mu} \frac{M_{RI}}{N_{RI}}}$

may not indicate the substantially same reference MCS. Accordingly, tocalculate all the values from one equal reference MCS, Equation 28 mayexpressed by the following Equation 34.

$\begin{matrix}{{M_{RE}^{PUSCH} - M_{data}} = {M_{CQI} + \left\lceil {N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot \frac{M_{data}}{N_{data}}} \right\rceil}} & \left\lbrack {{Equation}\mspace{14mu} 34} \right\rbrack\end{matrix}$

To solve a quantization problem, Equation 34 may be replaced withEquation 35.

(M _(RE) ^(PUSCH) −M _(data) −M _(CQI))·N _(data) ≧N _(RI)·β_(RI) ·M_(data)  [Equation 35]

When M_(data), N_(data), N_(RI), β_(RI), and M_(RE) ^(PUSCH) are given,M_(CQI) is the smallest integer satisfying Equation 35.

If M_(data) and M_(CQI) are obtained, M_(RI) may be calculated asfollows.

M _(RI) =M _(RE) ^(PUSCH) −M _(data) −M _(CQI)  [Equation 36]

Similarly, Equation 31 may be expressed by the following Equation 37.M_(data), M_(CQI), and M_(RI) are calculated using Equation 37.

$\begin{matrix}{{M_{RE}^{PUSCH} - M_{data}} = {M_{RI} + \left\lceil {N_{CQI} \cdot 10^{\frac{\Delta_{CQI}}{10}} \cdot \frac{M_{data}}{N_{data}}} \right\rceil}} & \left\lbrack {{Equation}\mspace{14mu} 37} \right\rbrack\end{matrix}$

To solve a quantization problem, Equation 37 may be replaced with thefollowing Equation 38.

(M _(RE) ^(PUSCH) −M _(data) −M _(RI))·N _(data) ≧N _(CQI)·β_(RI) ·M_(data)  [Equation 38]

When M_(data), N_(data), β_(RI), N_(CQI), and M_(RE) ^(PUSCH) are given,M_(RI) is the smallest integer satisfying Equation 38.

If M_(data) and M_(RI) are obtained, M_(CQI) may be calculated asfollows.

M _(CQI) =M _(RE) ^(PUSCH) −M _(data) −M _(RI)  [Equation 39]

In Embodiment 1-B, an order for calculating M_(data), M_(RI), andM_(CQI) are as follows.

(1) Step 1 (Step for Obtaining M_(Data)):

M_(data) satisfying (M_(RE)^(PUSCH)−M_(data))·N_(data)≧N_(RI)·β_(RI)·M_(data)+N_(CQI)·β_(CQI)·M_(data)is calculated. In this case, when N_(data), N_(RI), β_(RI), N_(CQI),β_(CQI), and M_(RE) ^(PUSCH) are given, M_(data) is the smallest integersatisfying the above equation.

(2) Step 2 (Step for Obtaining M_(CQI)):

M_(CQI) satisfying (M_(RE)^(PUSCH)−M_(data)−M_(CQI))·N_(data)≧N_(RI)·β_(RI)·M_(data) iscalculated. In this case, when M_(data), N_(data), N_(RI), β_(RI), andN_(RE) ^(PUSCH) are given, M_(CQI) is the smallest integer satisfyingthe above equation.

(3) Step 3 (Step for Obtaining M_(RI)):

M_(RI) is calculated using M_(RI)=M_(RE) ^(PUSCH)−M_(data)−M_(CQI).

Embodiment 1-C

In Embodiment 1-A, the reference MCS does not actually consider anaccurate code rate and modulation order of information when data,CQI/PMI, and rank indication are transmitted. In Embodiment 1-B, themethod for calculating each infatuation field is complicated. InEmbodiment 1-C, a method for expressing the reference MCS as a functionof a variety of information is proposed using the fact that an MCS ofinformation most approximates to the reference MCS when utilizingEmbodiment 1-B. That is, an approximated equation is used as follows.

$\begin{matrix}{{MCS}_{ref} \approx \frac{M_{data}}{N_{data}} \approx \frac{M_{CQI}}{N_{CQI}} \approx \frac{M_{RI}}{N_{RI}}} & \left\lbrack {{Equation}\mspace{14mu} 40} \right\rbrack\end{matrix}$

where reference symbol “≈” indicates that a left value and a right valeare approximately equal.

When defining the reference MCS as the ratio of the number oftransmitted symbols of information to a payload size of information, aproblem of not being aware of the number of transmitted symbols ofinformation arises. However, since the total number of transmittedsymbols is known, the reference MCS may be obtained using the followingEquation 41 without calculating the number of transmitted symbols ofinformation.

$\begin{matrix}{\frac{B_{1}}{A_{1}} = {\frac{B_{2}}{A_{2}} = {\frac{B_{3}}{A_{3}} = \frac{B_{1} + B_{2} + B_{3}}{A_{1} + A_{2} + A_{3}}}}} & \left\lbrack {{Equation}\mspace{14mu} 41} \right\rbrack\end{matrix}$

Using Equation 41, the following Equation 41 may be induced.

$\begin{matrix}\begin{matrix}{{MCS}_{ref} \approx \frac{M_{data}}{N_{data}}} \\{\approx \frac{M_{CQI}}{\beta_{CQI} \cdot N_{CQI}}} \\{\approx \frac{M_{RI}}{\beta_{RI} \cdot N_{RI}}} \\{\approx \frac{\left( {M_{data} + M_{CQI} + M_{RI}} \right) = M_{RE}^{PUSCH}}{N_{data} + {\beta_{CQI} \cdot N_{CQI}} + {\beta_{RI} \cdot N_{RI}}}}\end{matrix} & \left\lbrack {{Equation}\mspace{14mu} 41} \right\rbrack\end{matrix}$

Even though a variety of information is multiplexed and thentransmitted, a UE recognizes the total number of transmitted symbols anda payload size of corresponding information. In addition, even when thenumber of transmitted symbols of corresponding information is unknown,an approximate reference MCS may be calculated using the fact that thesum of the numbers of transmitted symbols of corresponding informationis equal to the total number of symbols transmitted on an UL-SCH.

In this case, since the number of transmitted symbols of correspondinginformation is determined by an offset value for compensating for adifference in a coding gain or an operation block error rate withrespect to data, the reference MCS may be defined as follows.

(1) When data and CQI/PMI are transmitted on a UL-SCH, the reference MCSmay be defined by the following Equation 43.

$\begin{matrix}{{MCS}_{ref} = {\frac{M_{data} + M_{CQI}}{N_{data} + {\beta_{CQI} \cdot N_{CQI}}} = \frac{M_{RE}^{PUSCH}}{N_{data} + {\beta_{CQI} \cdot N_{CQI}}}}} & \left\lbrack {{Equation}\mspace{14mu} 43} \right\rbrack\end{matrix}$

(2) When data and rank indication are transmitted on a UL-SCH, thereference MCS may be defined as follows.

$\begin{matrix}{{MCS}_{ref} = {\frac{M_{data} + M_{RI}}{N_{data} + {\beta_{RI} \cdot N_{RI}}} = \frac{M_{RE}^{PUSCH}}{N_{data} + {\beta_{RI} \cdot N_{RI}}}}} & \left\lbrack {{Equation}\mspace{14mu} 44} \right\rbrack\end{matrix}$

(3) When data, CQI/PMI, and rank indication are transmitted on a UL-SCH,the reference MCS may be defined as follows.

$\begin{matrix}\begin{matrix}{{MCS}_{ref} = \frac{M_{data} + M_{CQI} + M_{RI}}{N_{data} + {\beta_{CQI} \cdot N_{cQI}} + {\beta_{RI} \cdot N_{RI}}}} \\{= \frac{M_{RE}^{PUSCH}}{N_{data} + {\beta_{CQI} \cdot N_{CQI}} + {\beta_{RI} \cdot N_{RI}}}}\end{matrix} & \left\lbrack {{Equation}\mspace{14mu} 45} \right\rbrack\end{matrix}$

Namely, the reference MCS is defined as a value obtained by dividing thetotal number of symbols transmitted on a UL-SCH by the sum of payloadsizes of transmitted information. At this time, offset values forcompensating for a difference with the reference MCS of data such as adifference in an encoding scheme, in an operation block error rate, etc.are multiplied to the payload size of corresponding information.

Therefore, the numbers of actually transmitted symbols of CQI/PMI andrank indication may be calculated using the following Equation 46.

$\begin{matrix}{M_{X} = {\left\lceil {N_{X} \cdot 10^{\frac{\Delta_{X}}{10}} \cdot {MCS}_{ref}} \right\rceil = \left\lceil {N_{X} \cdot \beta_{X} \cdot {MCS}_{ref}} \right\rceil}} & \left\lbrack {{Equation}\mspace{20mu} 46} \right\rbrack\end{matrix}$

where N_(X) denotes a payload size of information X, A_(X) denotes aparameter expressing, in dB, an offset value for compensating for adifference between a data decoding scheme and an information (X)decoding scheme, and M_(X) denotes the number of transmitted symbols ofinformation X. In this case, the information X may be CQI/PMI or rankindication.

The number of transmitted symbols of data is a value obtained bysubtracting the numbers of transmitted symbols of CQI/PMI and rankindication from the total number of symbols which can be transmitted.

The following examples indicate methods for calculating the number oftransmitted symbols of data.

(1) When data and CQI/PMI are transmitted on a UL-SCH, the number oftransmitted symbols of data is calculated as follows.

M _(data) =M _(RE) ^(PUSCH) −M _(CQI)  [Equation 47]

(2) When data and rank indication are transmitted on a UL-SCH, thenumber of transmitted symbols of data is calculated as follows.

M _(data) =M _(RE) ^(PUSCH) −M _(RI)  [Equation 48]

(1) When data, CQI/PMI, and rank indication are transmitted on a UL-SCH,the number of transmitted symbols of data is calculated as follows.

M _(data) =M _(RE) ^(PUSCH) −M _(CQI) −M _(RI)  [Equation 49]

While the case where data is transmitted on a UL-SCH has been described,CQI/PMI and rank indication may be transmitted on the UL-SCH withouttransmitting the data.

Hereinafter, a method will be described for calculating a code rate ofcontrol information when data is not transmitted on a UL-SCH.

In such a case, an eNB informs a UE of only the total number of symbolstransmitted on the UL-SCH. Therefore, a reference MCS is not present. Amethod is proposed for calculating the reference MCS when CQI/PMI andrank indication are transmitted on the UL-SCH.

Embodiment 2-A

In Embodiment 2-A, a method is proposed for calculating a reference MCSusing the code rate and modulation order of CQI/PMI under the assumptionthat only the CQI/PMI is transmitted on a UL-SCH when the CQI/PMI andrank indication are transmitted.

The code rate of the CQI/PMI may be defined as follows.

$\begin{matrix}{{CR}_{CQI} = \frac{N_{CQI}}{Q_{CQI} \cdot M_{RE}^{PUSCH}}} & \left\lbrack {{Equation}\mspace{14mu} 50} \right\rbrack\end{matrix}$

where CR_(CQI) denotes a reference code rate, N_(CQI) denotes a payloadsize of CQI/PMI, Q_(CQI) denotes a modulation order of CQI/PMI which isa reference modulation order, and M_(RE) ^(PUSCH) denotes the number ofsymbols which can be transmitted through a physical channel whentransmitting CQI/PMI on a UL-SCH.

Accordingly, the reference MCS may be calculated as follows.

$\begin{matrix}{{MCS}_{ref} = {\frac{1}{{CR}_{CQI} \cdot Q_{CQI}} = \frac{M_{RE}^{PUSCH}}{N_{CQI}}}} & \left\lbrack {{Equation}\mspace{14mu} 51} \right\rbrack\end{matrix}$

Application of Embodiment 2-A In the Case where CQI/PMI and RankIndication are Transmitted Together

When CQI/PMI and rank indication are transmitted together, the number oftransmitted symbols of the rank indication is calculated first using areference MCS as shown in the following Equation 52. Next, the number oftransmitted symbols of the CQI/PMI is calculated by subtracting thenumber of transmitted symbols of the rank indication from the totalnumber of symbols which can be transmitted through a physical channel.

$\begin{matrix}{M_{RI} = \left\lceil {N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot {MCS}_{ref}} \right\rceil} & \left\lbrack {{Equation}\mspace{14mu} 52} \right\rbrack \\{M_{CQI} = {M_{RE}^{PUSCH} - M_{RI}}} & \left\lbrack {{Equation}\mspace{14mu} 53} \right\rbrack\end{matrix}$

In Equation 52 and Equation 53, N_(RI) denotes a payload size of rankindication, Δ_(RI) denotes a parameter expressing, in dB, an offsetvalue for compensating for a difference between a block error rate ofdata and a block error rate of rank indication and a difference betweena data encoding scheme and a rank indication encoding scheme, M_(RI)denotes the number of transmitted symbols of rank indication, M_(RE)^(PUSCH) denotes the total number of symbols which can be transmittedthrough a physical channel, and M_(CQI) denotes the number oftransmitted symbols of CQI/PMI.

However, the method described in Embodiment 2-A may be differentlyimplemented in a UE and an eNB as described in Embodiments 1-A and 1-B.

Therefore, to solve such a problem, Equation 52 may be replaced with thefollowing Equation 54.

M _(RI) ·N _(CQI) ≧N _(RI)·β_(RI) ·M _(RE) ^(PUSCH)  [Equation 54]

When N_(CQI), N_(RI), β_(RI), and M_(RE) ^(PUSCH) are given, M_(RI) isthe smallest integer satisfying Equation 54.

If M_(RI) is obtained, M_(CQI) is calculated using Equation 53.

When calculating a code rate of the CQI/PMI using the method describedin Embodiment 2-A, an accurate code rate is not applied to information(i.e., CQI/PMI and rank indication). Assuming that a reference code rateis a code rate of the CQI/PMI, the code rate of the CQI/PMI can bedetermined only when an occupied ratio of rank indication among theentire amount of information should be determined. Namely, the methoddescribed in Embodiment 2-A assumes the code rate of the CQI/PMI in anideal state as the reference code rate under the assumption that onlythe CQI/PMI is transmitted.

Embodiment 2-B

In Embodiment 2-B, a method is proposed for simultaneously calculatingreference code rates of CQI/PMI and rank indication in a closed formusing the fact that the total number of transmitted symbols is the sumof the numbers of transmitted symbols of the CQI/PMI and rank indicationon a UL-SCH.

Specifically, assuming that a reference MCS is an unknown parameter andthe numbers of transmitted symbols of CQI/PMI and rank indication areexpressed as a function of the reference MCS, since the total number oftransmitted symbols of the CQI/PMI and rank indication is known, anaccurate reference MCS can be obtained.

When the CQI/PMI and rank indication are transmitted on the UL-SCH, thetotal number of symbols transmitted on the UL-SCH may be indicated bythe sum of the number of transmitted symbols of the CQI/PMI and thenumber of transmitted symbols of the rank indication. Accordingly, areference MCS is calculated using the equation for calculating thenumber of transmitted symbols of the rank indication and the equationfor calculating the number of finally transmitted symbols of theCQI/PMI. The number of transmitted symbols of the rank indication iscalculated using the calculated reference MCS and then the number oftransmitted symbols of the CQI/PMI is calculated.

Namely, the number of transmitted symbols of the rank indication iscalculated using the following Equation 55. In this case, the number oftransmitted symbols of the CQI/PMI is expressed as a function of thenumber of transmitted symbols of the rank indication and a closed-formequation is obtained as shown in the following Equation 56.

$\begin{matrix}{M_{RE}^{PUSCH} = {M_{CQI} + M_{RI}}} & \left\lbrack {{Equation}\mspace{14mu} 55} \right\rbrack \\\begin{matrix}{M_{RE}^{PUSCH} = {M_{CQI} + \left\lceil {N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot {MCS}_{ref}} \right\rceil}} \\{= {M_{CQI} + \left\lceil {N_{RI} \cdot 10^{\frac{\Delta_{RI}}{10}} \cdot \frac{M_{CQI}}{N_{CQI}}} \right\rceil}}\end{matrix} & \left\lbrack {{Equation}\mspace{14mu} 56} \right\rbrack\end{matrix}$

In Equation 54 and Equation 55, N_(RI) denotes a payload size of rankindication, Δ_(RI) denotes a parameter expressing, in dB, an offsetvalue for compensating for a difference between a block error rate ofdata and a block error rate of rank indication and a difference betweena data encoding scheme and a rank indication encoding scheme, M_(RI)denotes the number of transmitted symbols of rank indication, M_(RE)^(PUSCH) denotes the total number of symbols which can be transmittedthrough a physical channel, and M_(CQI) denotes the number oftransmitted symbols of CQI/PMI.

To solve a quantization problem, Equation 56 may be replaced with thefollowing Equation 57.

(M _(RE) ^(PUSCH) −M _(CQI))·N _(CQI) ≧N _(RI)·β_(RI) ·M_(CQI)  [Equation 57]

where β_(RI) denotes a value obtained by quantizing

$10^{\frac{\Delta_{RI}}{10}}.$

When N_(RI), N_(CQI), β_(RI), and M_(RE) ^(PUSCH) are given, M_(CQI) isthe smallest integer satisfying Equation 57.

Embodiment 2-C

Embodiment 2-C uses the same principle as Embodiment 1-C. Since there isno transmitted data, rank indication is calculated first whencalculating CQI/PMI. Accordingly, when the rank indication and CQI/PMIare transmitted on a UL-SCH, a reference MCS is defined as follows.

$\begin{matrix}\begin{matrix}{{MCS}_{ref} = \frac{M_{CQI} + M_{RI}}{{\beta_{CQI} \cdot N_{CQI}} + {\beta_{RI} \cdot N_{RI}}}} \\{= \frac{M_{RE}^{PUSCH}}{{\beta_{CQI} \cdot N_{CQI}} + {\beta_{RI} \cdot N_{RI}}}}\end{matrix} & \left\lbrack {{Equation}\mspace{14mu} 58} \right\rbrack\end{matrix}$

The number of transmitted symbols of the rank indication is calculatedusing the following Equation 59. The number of transmitted symbols ofthe CQI/PMI is a calculated by subtracting the number of transmittedsymbols of the rank indication from the total number of symbolstransmitted on the UL-SCH.

$\begin{matrix}\begin{matrix}{M_{X} = \left\lceil {N_{X} \cdot 10^{\frac{\Delta_{X}}{10}} \cdot {MCS}_{ref}} \right\rceil} \\{= \left\lceil {N_{X} \cdot \beta_{X} \cdot {MCS}_{ref}} \right\rceil}\end{matrix} & \left\lbrack {{Equation}\mspace{14mu} 59} \right\rbrack\end{matrix}$

where N_(X) denotes a payload size of information X, Δ_(X) denotes aparameter expressing, in dB, an offset value for compensating for adifference between a data decoding scheme and an information (X)decoding scheme, and M_(X) denotes the number of transmitted symbols ofinformation X. In Equation 59, the information X may correspond to therank indication.

Embodiment 3

ACK/NACK information is inserted through puncturing multiplexed data,CQI/PMI, and rank indication and thus a code rate of the information canbe changed. However, since an eNB does not always know whether or not aUE transmits ACK/NACK information, the number of transmitted symbols ofACK/NACK information is independently calculated using a reference MCSafter the number of occupied symbols on a UL-SCH.

When data is present,

${MCS}_{ref} = {{\frac{M_{RE}^{PUSCH}}{N_{data}}\mspace{14mu} {or}\mspace{14mu} {MCS}_{ref}} = \frac{M_{data}}{N_{data}}}$

is used as a reference MCS. When data is not present and only CQI/PMIand rank indication are transmitted on a UL-SCH,

${MCS}_{ref} = {{\frac{M_{RE}^{PUSCH}}{N_{CQI}}\mspace{14mu} {or}\mspace{14mu} {MCS}_{ref}} = \frac{M_{CQI}}{N_{CQI}}}$

is used as the reference MCS. That is, a reference MCS used by ACK/NACKinformation may be generalizes as

${MCS}_{ref} = \frac{M_{X}}{N_{X}}$

and the number of transmitted symbols of the ACK/NACK information may berepresented as follows.

$\begin{matrix}{M_{A/N} = {\left\lceil {N_{A/N} \cdot 10^{\frac{\Delta_{A/N}}{10}} \cdot {MCS}_{ref}} \right\rceil = \left\lceil {N_{A/N} \cdot 10^{\frac{\Delta_{A/N}}{10}} \cdot \frac{M_{X}}{N_{X}}} \right\rceil}} & \left\lbrack {{Equation}\mspace{14mu} 60} \right\rbrack\end{matrix}$

where N_(A/N) denotes a payload size of ACK/NACK info illation, andΔ_(A/N) denotes a parameter expressing, in dB, an offset value forcompensating for a difference between a block error rate of data and ablock error rate of ACK/NACK information and a difference between a dataencoding scheme and a ACK/NACK information encoding scheme, and M_(A/N)denotes the number of finally transmitted symbols of ACK/NACKinformation.

To solve a quantization problem, a method for calculating the number oftransmitted symbols of ACK/NACK information through a physical channelis as follows.

M _(A/N) ·N _(X) ≧N _(A/N)·β_(A/N) ·M _(X)  [Equation 61]

where β_(A/N) denotes a value obtained by quantizing

$10^{\frac{\Delta_{A/N}}{10}}.$

When M_(X), N_(X), β_(A/N), and N_(A/N) are given, M_(A/N) is thesmallest integer satisfying Equation 61.

Embodiment 4

Differently from data or CQI/PMI, ACK/NACK information and rankindication transmitted on a UL-SCH always use quadrature phase shiftkeying (QPSK) or binary phase shift keying (BPSK) modulation. Toimplement such a specific modulation scheme, the ACK/NACK and rankindication may use only 4 outermost coordinates (2 outermost coordinateswhen BPSK is used) of a modulation constellation of the data or CQI/PMI.

FIG. 11 illustrates an example of modulation constellation coordinatesused by ACK/NACK information and rank indication when data and CQI/PMIuse a 16 quadrature amplitude modulation (QAM) scheme. FIG. 12illustrates an example of modulation constellation coordinates used byACK/NACK information and rank indication when data and CQI/PMI use a 64QAM scheme.

As illustrated in FIGS. 11 and 12, if ACK/NACK information and rankindication use the 4 outermost coordinates, since the locations ofsymbols of the ACK/NACK information and rank indication may be farthestaway from each other in terms of Euclidean distance, performance may beimproved.

However, if only the outermost coordinates are used on modulationconstellation coordinates, an average power of transmission of ACK/NACKinformation and rank indication is greater than 1 under the assumptionthat an average power of transmission of data and CQI/PMI is 1.Accordingly, when calculating the number of transmitted symbols of theACK/NACK information and rank indication on a UL-SCH, if a modulationorder of the data or CQI/PMI is 16 QAM or 64 QAM, a method is proposedfor calculating the number of transmitted symbols of the ACK/NACKinformation and rank indication on the UL-SCH using an additionalcompensation offset parameter

$\beta_{QAM} = 10^{\frac{\Delta_{QAM}}{10}}$

in addition to a compensation offset parameter

$\beta_{A/N} = {{10^{\frac{\Delta_{A/N}}{10}}\mspace{14mu} {or}\mspace{14mu} \beta_{RI}} = {10^{\frac{\Delta_{RI}}{10}}.}}$

When the modulation order of the data or CQI/PMI is QPSK, M_(A/N) andM_(RI) are calculated using the above-described Embodiments 1-A, 1-B,2-A, and 2-B. When the modulation order of the data or CQI/PMI is 16QAM, the number of symbols of corresponding information is calculatedusing

${{\hat{\beta}}_{RI} = {{\beta_{RI} \cdot \beta_{16{QAM}}} = {10^{\frac{\Delta_{RI} + \Delta_{16{QAM}}}{10}}\mspace{14mu} {or}}}}\mspace{14mu}$${\hat{\beta}}_{A/N} = {{\beta_{A/N} \cdot \beta_{16{QAM}}} = 10^{\frac{\Delta_{A/N} + \Delta_{16{QAM}}}{10}}}$

instead of

$\beta_{RI} = {{10^{\frac{\Delta_{RI}}{10}}\mspace{14mu} {or}\mspace{14mu} \beta_{A/N}} = 10^{\frac{\Delta_{A/N}}{10}}}$

in Embodiments 1-A, 1-B, 2-A, and 2-B.

When the modulation order of the data or CQI/PMI is 64 QAM, the numberof symbols of information is calculated using

${{\hat{\beta}}_{RI} = {{\beta_{RI} \cdot \beta_{16{QAM}}} = {10^{\frac{\Delta_{RI} + \Delta_{64{QAM}}}{10}}\mspace{14mu} {or}}}}\mspace{14mu}$${\hat{\beta}}_{A/N} = {{\beta_{A/N} \cdot \beta_{64{QAM}}} = 10^{\frac{\Delta_{A/N} + \Delta_{64{QAM}}}{10}}}$

instead of

$\beta_{RI} = {{10^{\frac{\Delta_{RI}}{10}}\mspace{14mu} {or}\mspace{14mu} \beta_{A/N}} = 10^{\frac{\Delta_{A/N}}{10}}}$

in Embodiments 1-A, 1-B, 2-A, and 2-B.

To compensate for a difference in power of the ACK/NACK information andthe rank indication when using 16 QAM or 64 QAM as the modulation orderof the data or CQI/PMI, offset values

$\beta_{A/N} = {{10^{\frac{\Delta_{A/N}}{10}}\mspace{14mu} {and}\mspace{14mu} \beta_{RI}} = 10^{\frac{\Delta_{RI}}{10}}}$

of the ACK/NACK information and the rank indication may be setdifferently according to the modulation order. Therefore, acorresponding offset value is used according to the modulation order ofthe data or the CQI/PMI.

Embodiment 5

The maximum numbers of transmissible symbols of rank indication andACK/NACK information may be limited. As a method proposed in the presentinvention, when calculating M_(A/N) which is the numbers of transmittedsymbols of the ACK/NACK information, if M_(A/N) is greater than themaximum number of transmissible symbols of ACK/NACK information, M_(A/N)is set to the maximum numbers of transmissible symbols of the ACK/NACKinformation. In addition, when calculating M_(RI) which is the numbersof transmitted symbols of the ACK/NACK information, if M_(RI) is greaterthan the maximum number of transmissible symbols of rank indication,M_(RI) is set to the maximum numbers of transmissible symbols of therank indication. The maximum numbers or values of M_(A/N) and M_(RI) maybe 12×N_(RB)×4. Herein, N_(RB) denotes the number of resource blocks(RBs) transmitted through a physical uplink shared channel (PUSCH). Ifone RB is transmitted through the PUSCH, the maximum values of M_(A/N)and M_(RI) are 48.

As in Embodiment 1-B, if the data, CQI/PMI, and rank indication aremultiplexed, the number of transmitted symbols of the rank indicationmay be calculated last according to circumstances. Then it is confirmedwhether the number M_(RI) of transmitted symbols of the rank indicationexceeds a maximum transmissible value. If M_(RI) exceeds the maximumvalue, M_(RI) is limited to the maximum value and symbols of the data orCQI/PMI corresponding to a difference between the calculated M_(RI) andthe maximum transmissible value are further transmitted.

Embodiment 6

In some cases, a reference code rate greater than 1 may be set orcalculated. If the reference code rate is greater than 1, CQI/PMI, rankindication, and ACK/NACK information are not decoded in an eNB and a UEmay transmit unnecessary information. In this case, the number oftransmitted symbols of the CQI/PMI, rank indication, and ACK/NACKinformation may be set to 0 and only data may be transmitted.

To efficiently use one uplink, an eNB may not generate a circumstancehaving a code rate greater than 1. If a UE senses such a circumstance,it is determined that the eNB has made a mistake or the UE has readdifferent control information so that no information may be transmittedto the uplink.

Embodiment 7

In a communication system, if an error occurs in a data packet due tofailure of receipt after the data packet is transmitted, thecorresponding data packet is re-transmitted. Retransmission may becommended by eNB or may be performed via a predetermined schedule.

FIG. 13 shows a HARQ process for explaining data retransmission. Asshown in FIG. 13, it is configured that maximum process is set to be 8processes and maximum retransmission time is set to be 4. In eachprocess, when the UE receives UL_Grant from the eNB at n_(th) subframetiming, the UE start to transmit data in n+4^(th) subframe.

For example, in process 1, if the UE does not receive ACK from the eNBduring 3 times retransmission of data (e.g., denoted by ‘1’ in FIG. 13)stored in a buffer after starting to transmit data in a n+4_(th)subframe, the UE performs buffer flush, reconstructs the data andtransmits the reconstructed data (e.g., denoted by 1 _(re) in FIG. 13).Process 2 is an identical case to the process 1. In Process 3, if the UEreceives ACK from the eNB after retransmitting data (e.g., dented by 3in FIG. 13) 2 times, the UE transmits new data (e.g., denoted by 3′ inFIG. 13) at 4^(th) transmission timing. In addition, in process 3, ifthe UE does not receive ACK from the eNB after transmitting the newdata, the UE retransmits the new data at 5^(th) transmission timing.Processes 4 to 6 can be explained as described above. In addition, eachof processes 1 to 8 is operated independently.

In the case where re-transmission occurs, if decoding is performed usingan initially received data packet and a data packet received byre-transmission, a success probability of receiving the data packet isincreased even though not all resources employed when the data packet isinitially transmitted are used.

For example, when the communication system operates such that theinitial data packet is transmitted without errors with a probability of90%, the system does not encounter any problem even when the data packetis re-transmitted at a code rate higher than a code rate of the initialdata packet. Transmitting a data packet at a high code rate means thatless physical transmission resources are used than during the initialtransmission of the data packet.

In the present invention, a method for calculating a reference MCS usinga packet size of data and the total number of symbols which can betransmitted through a PUSCH and a method for calculating the number oftransmitted symbols of CQI/PMI and rank indication using the referenceMCS have been proposed.

However, even though a lower number of symbols of data is transmittedthan during initial transmission, no problem occurs in system operationand efficiency may be improved. Accordingly, a lower number of totalsymbols on a PUSCH may be allocated during re-transmission of data. Atthis time, CQI/PMI and/or rank indication may be multiplexed withre-transmitted data and then may be transmitted.

If the reference MCS is calculated using the total number of symbolswhich can be transmitted at a corresponding PUSCH transmission time, acode rate which can stably transmit the CQI/PMI and/or the rankindication may not be set. FIG. 14 is a diagram explaining a userelationship of a reference MCS during re-transmission of data. Asillustrated in FIG. 14, while data is re-transmitted through a PUSCH, amethod for calculating the numbers of transmitted symbols of CQI/PMI,rank indication, and ACK/NACK information is proposed using a code rateused during the initial transmission of data.

More specifically, a reference MCS in the following Equation 62 tocalculate the number of transmitted symbols of information X employs areference MCS used when data is initially transmitted.

$\begin{matrix}{M_{X} = \left\lceil {N_{X} \cdot 10^{\frac{\Delta_{X}}{10}} \cdot {MCS}_{ref}} \right\rceil} & \left\lbrack {{Equation}\mspace{14mu} 62} \right\rbrack\end{matrix}$

where MCS_(ref) denotes a reference MCS when the data is initiallytransmitted, N_(X) denotes a payload size of information X, Δ_(X)denotes a parameter expressing, in dB, an offset value for compensatingfor a difference between the decoding scheme of data and the decodingscheme of the information X, and M_(X) denotes the number of transmittedsymbols of information X. The information X can be CQI/PMI, rankindication or ACK/NACK information.

The equation 62 can be expressed by the following equation 63.

$\begin{matrix}{Q^{\prime} = \left\lceil \frac{O \cdot M_{sc}^{{PUSCH} - {initial}} \cdot N_{symb}^{{PUSCH} - {initial}} \cdot \beta_{offset}^{PUSCH}}{\sum\limits_{r = 0}^{C - 1}K_{r}} \right\rceil} & \left\lbrack {{Equation}\mspace{14mu} 63} \right\rbrack\end{matrix}$

In the Equation 63, Q′ is the number of transmitted symbols of thecontrol information (e.g., CQI/PMI, rank indication or ACK/NACKinformation) when the data is retransmitted, O is the payload size ofthe control information when the data is retransmitted. N_(symb)^(PUSCH-initial) is a number of SC-FDMA symbols per subframe forPhysical Uplink Shared Channel (PUSCH) transmission when the data isinitially transmitted and M_(sc) ^(PUSCH-initial) is a scheduledbandwidth PUSCH transmission when the data is initially transmitted.Thus, M_(sc) ^(PUSCH-initial)·N_(symb) ^(PUSCH-initial) is the totalnumber of transmissible symbols of Physical Uplink Shared Channel(PUSCH) when the data is initially transmitted. β_(offset) ^(PUSCH) isthe offset value.

$\sum\limits_{r = 0}^{C - 1}K_{r}$

is the payload size of the data when the data is initially transmitted,r is code block number of the data before channel coding, K_(r) is anumber of bits in code block number r, and C is a total number of codeblocks.

In an LTE system, when a data packet is re-transmitted, redundancyversion (RV) numbers are assigned according to a re-transmission form.However, in transmission through a PUSCH, RV numbers 1, 2, and 3 amongRV numbers 0, 1, 2, and 3 are used only for re-transmission. Therefore,if data is transmitted during PUSCH transmission with the RV number 1,2, or 3, the numbers of transmitted symbols of CQI/PMI, rank indication,and ACK/NACK information are calculated using a reference MCS when datais transmitted with the RV number 0. Namely, if data is retransmitted,the numbers of transmitted symbols of CQI/PMI, rank indication, andACK/NACK information are calculated by using the equation 63.

In embodiment 7, a function of each module of a UE duringre-transmission of the data is as follows.

FIG. 15 is a block diagram of a UE according to an exemplary embodimentof the present invention. A UE 130 includes a first channel codingmodule 131, a second channel coding module 132, and a transport module133. The UE 130 may further include modules such as a multiplexingmodule, a transport module, and an interleaving module but these areomitted for convenience of description.

The first channel coding module 131 performs channel coding upon data tobe re-transmitted. The second channel coding module 132 performs channelcoding upon control information.

The second channel coding module 132 calculates the number oftransmitted symbols of the control channel by using the Equation 63.

The transport module 133 performs channel interleaving upon the firstchannel-coded data and the second channel-coded control information andtransmits the interleaved uplink signal to an uplink.

According to the above-described configuration, a code rate for stablytransmitting the CQI/PMI and/or rank indication during re-transmissionof data can be set.

As is apparent from the above description, when data and controlinformation are transmitted via an uplink channel, an uplink signalincluding the data and control information can be transmitted byaccurately calculating code rates of the data and control information.

The present invention may be applied to a UE, an eNB or other equipmentof a radio mobile communication system. If applied to an eNB, the eNBperforms a deinterleaving and decoding operation to derive the signalfrom the encoded/interleaved signal sent by the UE.

FIG. 16 is a block diagram showing constitutional elements of a device50, that can be either a UE or an eNB, and that can perform the methodsdescribed above. Device 50 includes a processor 51, a memory 52, a radiofrequency (RF) unit 53, a display unit 54, and a user interface unit 55.Layers of the radio interface protocol are implemented in the processor51. The processor 51 provides the control plane and the user plane. Thefunction of each layer can be implemented in the processor 51. Theprocessor 51 may also include a contention resolution timer. The memory52 is coupled to the processor 51 and stores an operating system,applications, and general files. If device 50 is a UE, the display unit54 displays a variety of information and may use a well-known elementsuch as a liquid crystal display (LCD), an organic light emitting diode(OLED), etc. The user interface unit 55 can be configured with acombination of well-known user interfaces such as a keypad, a touchscreen, etc. The RF unit 53 is coupled to the processor 51 and transmitsand/or receives radio signals.

The embodiments described above are provided by combining constituentelements and features of the present invention in specific forms. Theconstituent elements or features of the present invention may beconsidered optional if not explicitly stated otherwise. The constituentelements or features may be implemented without being combined withother constituent elements or features. The embodiments of the presentinvention may also be provided by combining some of the constituentelements and/or features. The order of operations in the embodiments ofthe present invention may be changed. Some constituent elements orfeatures of one embodiment may be included in another embodiment or maybe replaced with corresponding constituent elements or features ofanother embodiment. It is apparent that the present invention may beembodied by a combination of claims which do not have an explicit citedrelation in the appended claims or may include new claims by amendmentafter application.

The embodiments of the present invention have been described focusing onthe data communication relationship between an eNB and a UE. Here, theeNB refers to a terminal node of a network communicating directly withthe UE. In some cases, a specific operation described as being performedby the eNB may be performed by an upper node of the eNB.

Namely, it is apparent that the eNB or any other network nodes mayperform various operations for communication with the UE in a networkcomprised of a plurality of network nodes including the eNB. The term‘eNB’ may be replaced with the term ‘fixed station’, ‘Node B’, ‘accesspoint’, etc. The term ‘UE’ corresponds to a mobile station (MS) and theMS may be replaced with the team ‘subscriber station’ (SS), ‘mobilesubscriber station’ (MSS), ‘mobile terminal’, etc.

The UE employed in the present invention may be a personal digitalassistant (PDA), a cellular phone, a personal communication service(PCS) phone, a global system for mobile (GSM) phone, a wideband codedivision multiple access (wide CDMA) phone, a mobile broadband system(MBS) phone, etc.

The embodiments of the present invention may be implemented by variousmeans, for example, hardware, firmware, software, or a combinationthereof.

In a hardware configuration, methods according to the embodiments of thepresent invention may be implemented by one or more application specificintegrated circuits (ASICs), digital signal processors (DSPs), digitalsignal processing devices (DSPDs), programmable logic devices (PLDs),field programmable gate arrays (FPGAs), processors, controllers,microcontrollers, microprocessors, etc.

In a firmware or software configuration, methods according to theembodiments of the present invention may be implemented in the form ofmodules, procedures, functions, etc. which perform the above-describedfunctions or operations. Software code may be stored in a memory unit soas to be driven by a processor. The memory unit is located at theinterior or exterior of the processor and may transmit data to andreceive data from the processor via various known means.

The present invention may be embodied in other specific forms than thoseset forth herein without departing from the spirit and essentialcharacteristics of the present invention. The above description istherefore to be construed in all aspects as illustrative and notrestrictive. The scope of the invention should be determined byreasonable interpretation of the appended claims and all changes comingwithin the equivalency range of the invention are intended to beembraced in the scope of the invention.

What is claimed is:
 1. A method of transmitting control informationthrough a physical uplink shared channel (PUSCH) without data, whereinthe control information includes a rank indication (RI), the methodcomprising: channel encoding the RI based on a number of encoded symbolsof the RI to produce a channel encoded RI, wherein the number of encodedsymbols of the RI is determined to be either a value of the followingequation or a specific value if the value of the following equation isgreater than the specific value:$\left\lceil {N_{RI} \cdot \beta_{offset} \cdot \frac{M_{RE}^{PUSCH}}{N_{CQI}}} \right\rceil,$where N_(RI) is a size of the RI, β_(offset) is an offset value, N_(CQI)is an information size related to channel quality information (CQI),M_(RE) ^(PUSCH) is a size of resources for the PUSCH transmission, and“┌ ┐” denotes a ceiling function.
 2. The method of claim 1, furthercomprising: channel encoding the CQI to produce a channel encoded CQI;and channel interleaving the channel encoded RI and the channel encodedCQI.
 3. The method of claim 1, wherein the information size related tothe CQI includes a size of a Cyclic Redundancy Check (CRC) attached tothe CQI.
 4. The method of claim 1, wherein the size of resources for thePUSCH transmission (M_(RE) ^(PUSCH)) corresponds to:M _(sc) ^(PUSCH) ·N _(symb) ^(PUSCH) where M_(sc) ^(PUSCH) is ascheduled bandwidth for the PUSCH transmission, and N_(symb) ^(PUSCH) isa number of single carrier frequency division multiple access (SC-FDMA)symb symbols for the PUSCH transmission.
 5. A method of processingcontrol information received through a physical uplink shared channel(PUSCH) without data, wherein the control information includes a rankindication (RI), the method comprising: channel decoding channel encodedRI based on a number of encoded symbols of the RI to produce a channeldecoded RI, wherein the number of encoded symbols of the RI isdetermined to be either a value of the following equation or a specificvalue if the value of the following equation is greater than thespecific value:$\left\lceil {N_{RI} \cdot \beta_{offset} \cdot \frac{M_{RE}^{PUSCH}}{N_{CQI}}} \right\rceil,$where N_(RI) is a size of the RI, β_(offset) is an offset value, N_(CQI)is an information size related to channel quality information (CQI),M_(RE) ^(PUSCH) is a size of resources for the PUSCH transmission, and“┌ ┐” denotes a ceiling function.
 6. The method of claim 5, furthercomprising: channel de-interleaving the channel encoded RI and channelencoded CQI; and channel decoding the channel encoded CQI to produce achannel decoded CQI.
 7. The method of claim 5, wherein the informationsize related to the CQI includes a size of a Cyclic Redundancy Check(CRC) attached to the CQI.
 8. The method of claim 5, wherein the size ofresources for the PUSCH transmission (M_(RE) ^(PUSCH)) corresponds to:M _(sc) ^(PUSCH) ·N _(symb) ^(PUSCH) where M_(sc) ^(PUSCH) is ascheduled bandwidth for the PUSCH transmission, and N_(symb) ^(PUSCH) isa number of single carrier frequency division multiple access (SC-FDMA)symbols for the PUSCH transmission.
 9. An apparatus configured totransmit control information through a physical uplink shared channel(PUSCH) without data, wherein the control information includes a rankindication (RI), the apparatus comprising: a processor configured tochannel encode the RI based on a number of encoded symbols of the RI toproduce a channel encoded RI; and a Radio Frequency (RF) unit connectedto the processor and configured to transmit the channel encoded RIthrough the PUSCH, wherein the number of encoded symbols of the RI isdetermined to be either a value of the following equation or a specificvalue if the value of the following equation is greater than thespecific value:$\left\lceil {N_{RI} \cdot \beta_{offset} \cdot \frac{M_{RE}^{PUSCH}}{N_{CQI}}} \right\rceil,$where N_(RI) is a size of the RI, β_(offset) is an offset value, N_(CQI)is an information size related to channel quality information (CQI),M_(RE) ^(PUSCH) is a size of resources for the PUSCH transmission, and“┌ ┐” denotes a ceiling function.
 10. The apparatus of claim 9, whereinthe processor is further configured to: channel encode the CQI toproduce a channel encoded CQI; and channel interleave the channelencoded RI and the channel encoded CQI.
 11. The apparatus of claim 9,wherein the information size related to the CQI includes a size of aCyclic Redundancy Check (CRC) attached to the CQI.
 12. The apparatus ofclaim 9, wherein the size of resources for the PUSCH transmission(M_(RE) ^(PUSCH)) corresponds to:M _(sc) ^(PUSCH) ·N _(symb) ^(PUSCH) where M_(sc) ^(PUSCH) is ascheduled bandwidth for the PUSCH transmission, and N_(symb) ^(PUSCH) isa number of single carrier frequency division multiple access (SC-FDMA)symbols for the PUSCH transmission.
 13. An apparatus configured toprocess control information received through a physical uplink sharedchannel (PUSCH) without data, wherein the control information includes arank indication (RI), the apparatus comprising: a Radio Frequency (RF)unit configured to receive channel encoded RI through the PUSCH; and aprocessor connected to the RF unit and configured to channel decodechannel encoded RI based on a number of encoded symbols of the RI toproduce a channel decoded RI, wherein the number of encoded symbols ofthe RI is determined to be either a value of the following equation or aspecific value if the value of the following equation is greater thanthe specific value:$\left\lceil {N_{RI} \cdot \beta_{offset} \cdot \frac{M_{RE}^{PUSCH}}{N_{CQI}}} \right\rceil,$where N_(RI) is a size of the RI, β_(offset) is an offset value, N_(CQI)is an information size related to channel quality information (CQI),M_(RE) ^(PUSCH) is a size of resources for the PUSCH transmission, and“┌ ┐” denotes a ceiling function.
 14. The apparatus of claim 13, whereinthe processor is further configured to: channel de-interleave thechannel encoded RI and channel encoded CQI; and channel decode thechannel encoded CQI to produce a channel decoded CQI.
 15. The apparatusof claim 13, wherein the information size related to the CQI includes asize of a Cyclic Redundancy Check (CRC) attached to the CQI.
 16. Theapparatus of claim 13, wherein the size of resources for the PUSCHtransmission (M_(RE) ^(PUSCH)) corresponds to:M _(sc) ^(PUSCH) ·N _(symb) ^(PUSCH) where M_(sc) ^(PUSCH) is ascheduled bandwidth for the PUSCH transmission, and N_(symb) ^(PUSCH) isa number of single carrier frequency division multiple access (SC-FDMA)symbols for the PUSCH transmission.